a) [tex]\sqrt{75} =5\sqrt{3}[/tex]
b)[tex]\sqrt{(162)}=9\sqrt{2[/tex]
c)[tex]\sqrt{(48)}=4\sqrt{(3)}[/tex].
d)[tex]\sqrt{243} =9\sqrt{3} .[/tex]
e) [tex]\sqrt[4]{300}[/tex]
What is simplification?
When anything is made simpler or is broken down to its most basic components, it is referred to as being simplified. It is a simplification, as is any such diagram. Making anything simpler is the act or process of simplification.
a) [tex]\sqrt(75)=\sqrt(25*3)=\sqrt(25)*\sqrt(3)=5\sqrt(3).[/tex]
b) [tex]\sqrt(162) =\sqrt(81 * 2) = \sqrt(81) * \sqrt(2) = 9 \sqrt(2).[/tex]
c) [tex]\sqrt(48) = \sqrt(16 * 3) = \sqrt(16) * \sqrt(3) = 4 \sqrt(3).[/tex]
d) [tex]\sqrt(243) = \sqrt(81 * 3) = \sqrt(81) * \sqrt(3) = 9 \sqrt(3).[/tex]
e) [tex]\sqrt[4]{300}[/tex]
= 2 x 2 x root(3, 4) x 5
= 4 root(3, 4) x 5
= 20 root(3, 4)
f) 3√(125) = 3 x √(125)
= 3 x 5 √(5)
= 15 √(5)
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Part 2 Part of (t walmthetjevenue. If Walmart is excluded from the list, which measure of center would be more affected? I Walmal suded from the list, the measure of center that would be more affected is the [chooose one] - mean -median
If Walmart is excluded from the list, the measure of center that would be more affected is the mean. The median, on the other hand, is less affected by extreme values, as it represents the middle value in the dataset.
If Walmart is excluded from the list, the measure of center that would be more affected is the mean. This is because Walmart is a large retailer and has a significant impact on the overall average of the data. Removing Walmart from the list would decrease the total sales and therefore decrease the mean. The median, on the other hand, would be less affected by the exclusion of Walmart as it only looks at the middle value of the data and is less sensitive to extreme values. The measure of center that would be more affected is the mean. Value like Walmart's revenue would significantly change the average. The median is less affected by extreme values, as it represents the middle value in the dataset.
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Find the limit. Use l'Hospital's Rule where appropriate. If there is a more elementary method, consider using it.
lim (x â 3)/ (x² â 9)
xâ3
By using the L'Hospital's Rule, we have shown that the limit of x^(3/x) as x approaches infinity is equal to 1.
To find the limit of the function [tex]x^{3/x}[/tex] as x approaches infinity, we can use L'Hopital's Rule, which states that if we have an indeterminate form of a fraction such as 0/0 or infinity/infinity, we can take the derivative of the numerator and the denominator separately until we no longer have an indeterminate form.
First, we can rewrite the function as e^(ln([tex]x^{3/x}[/tex])). Then, we can use the properties of logarithms to simplify it further as e^((3ln(x))/x). Now, we have an indeterminate form of infinity/infinity, and we can apply L'Hopital's Rule.
Taking the derivative of the numerator and denominator, we get:
lim x→∞ [tex]x^{3/x}[/tex] = lim x→∞ e^((3ln(x))/x)
= e^(lim x→∞ (3ln(x))/x)
Using L'Hopital's Rule on the exponent, we get:
= e^(lim x→∞ (3/x²))
Since the denominator is approaching infinity faster than the numerator, the limit of 3/x² as x approaches infinity is zero, and we are left with:
= e^(0)
= 1
Therefore, the limit of [tex]x^{3/x}[/tex] as x approaches infinity is 1.
Alternatively, we can use some algebraic manipulation and the squeeze theorem to find the limit without using L'Hopital's Rule. We can rewrite the function as [tex]x^{3/x}[/tex] = (x^(1/x))³, and notice that as x approaches infinity, 1/x approaches zero, and so x^(1/x) approaches 1 (as the exponential function with base e^(1/x) approaches 1). Therefore, we have:
lim x→∞ [tex]x^{3/x}[/tex]= lim x→∞ (x^(1/x))³
= 1³
= 1
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Complete Question:
Find the limit. Use L'Hospital's Rule if appropriate. If there is a more elementary method, consider using it.
lim x→∞ [tex]x^{3/x}[/tex]
Suppose glucose is infused into the bloodstream at a constant rate of C g/min and, at the same time, the glucose is converted and removed from the bloodstream at a rate proportional to the amount of glucose present. Show that the amount of glucose A(t) present in the bloodstream at any time t is governed by the differential equation
A′= C −kA,
where k is a constant.
To show that the amount of glucose A(t) in the bloodstream at any time t is governed by the given differential equation, we need to consider the rates of glucose infusion and removal.
1. Glucose is infused into the bloodstream at a constant rate of C g/min. This means the rate of glucose infusion is simply C.
2. The glucose is converted and removed from the bloodstream at a rate proportional to the amount of glucose present. We can represent this by the equation: removal rate = kA, where k is a constant and A is the amount of glucose at time t.
Now, we can write the differential equation for A(t) by considering the net rate of change of glucose in the bloodstream. The net rate is the difference between the infusion rate and the removal rate:
A'(t) = infusion rate - removal rate
Substitute the values for the infusion rate and removal rate from the steps above:
A'(t) = C - kA
The amount of glucose A(t) in the bloodstream at any time t is governed by the differential equation A'(t) = C - kA, where C is the constant rate of glucose infusion, and k is the constant proportionality factor for glucose removal. This equation represents the net rate of change of glucose in the bloodstream, considering both infusion and removal rates.
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Assume that each sequence converges and find its limit. 1 1 6, 6+ = , 6+ 6' 1 6 + 6 1 6 + 1 6 + 1 6 + 6 The limit is (Type an exact answer, using radicals as needed.)
The limit of the given sequence is 7.
From the first three terms, we can see that the sequence is alternating between adding 5 and dividing by 6.
As we continue down the sequence, we can see that the terms approach 7.
To prove this, we can use the formula for the sum of an infinite geometric series, which is:
S = a / (1 - r)
Where S is the sum of the series, a is the first term, and r is the common ratio. In this case, a = 1 and r = 5/6. Plugging in these values, we get:
S = 1 / (1 - 5/6)
S = 1 / (1/6)
S = 6
Hence, we need to add the last term, which is 6, to get the actual sum of the sequence. Therefore, the limit of the sequence is 7.
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Which expression is equivalent to -18 - 64x?
So, an equivalent expression to [tex]-18 - 64x[/tex] is[tex]-2(9+32x)[/tex].
How to expression is equivalent?Expressions are considered equivalent when they have the same value, regardless of their form. There are different methods to determine whether expressions are equivalent depending on the type of expressions involved. Here are some examples:
Numeric expressions:
To determine whether two numeric expressions are equivalent, we can evaluate them and compare their results. For example, the expressions 3 + 4 and 7 have the same value, so they are equivalent.
Algebraic expressions:
To determine whether two algebraic expressions are equivalent, we can simplify both expressions using algebraic rules and compare the results. For example, the expressions 2x + 4 - x and x + 4 have the same value for any value of x, so they are equivalent.
Logical expressions:
To determine whether two logical expressions are equivalent, we can use truth tables to evaluate the expressions and compare the results. For example, the expressions (A ∧ B) ∨ C and (A ∨ C) ∧ (B ∨ C) have the same truth values for any values of A, B, and C, so they are equivalent.
The expression -18 - 64x can be simplified by factoring out a common factor of -2 from both terms. This gives:
[tex]-18 - 64x = -2(9 + 32x)[/tex]
So, an equivalent expression to -18 - 64x is -2(9 + 32x).
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Expressing the regression equation in terms of the x variable instead of the y variable will cause the y intercept and ____ to change.
Expressing the regression equation in terms of the x variable instead of the y variable will cause the y-intercept and slope to change.
When the regression equation is expressed in terms of the y variable, it takes the form of: [tex]u=ax+b[/tex] where a is the y-intercept (the value of y when x = 0) and b is the slope (the rate at which y changes with respect to x).
If we express the same regression equation in terms of the x variable, it becomes:
[tex]x=\frac{y-a}{b}[/tex]
In this form, the y-intercept becomes [tex](0,\frac{a}{b} )[/tex], which is a point on the x-axis, and the slope becomes [tex]\frac{1}{b}[/tex] , which is the reciprocal of the slope in the original equation.
Therefore, expressing the regression equation in terms of the x variable instead of the y variable will cause the y-intercept and slope to change
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Find the Maclaurin series and find the interval on which the expansion is valid.
f(x)=x2/1−x3
The Maclaurin series are:
f(x) = x^2/(1-x^3) = x^2 + x^4 + x^6 + x^8 + ...
The interval of convergence can be found by testing the endpoint values of the series.
We can use the geometric series formula to find the Maclaurin series of f(x):
1/(1-x) = 1 + x + [tex]x^{2} +x^{3}[/tex]...
Differentiating both sides with respect to x gives:
[1/(1-x)]' = 1 + 2x + [tex]3x^{2} +4x^{3}[/tex]+ ...
Multiplying both sides by [tex]x^{2}[/tex] gives:
[tex]x^{2}[/tex]/(1-[tex]x^{3}[/tex]) = [tex]x^{2}[/tex] + [tex]x^{4}[/tex] + [tex]x^{6}[/tex] + [tex]x^{8}[/tex] + ...
Therefore, we have:
f(x) = [tex]x^{2}[/tex]/(1-[tex]x^{3}[/tex]) = [tex]x^{2} +x^{4} +x^{6} +x^{8} +...[/tex]
The interval of convergence can be found by testing the endpoint values of the series. When x = ±1, the series becomes:
1 - 1 + 1 - 1 + ...
This series does not converge, so the interval of convergence is -1 < x < 1.
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Given a₁ = 4, d = 3.5, n = 14, what is the value of A(14)? A. A(14) = 97.5 B. A(14) = 53 C. A(14) = 49.5 D. A(14) = 55.5
When a₁ = 4, d = 3.5, and n = 14 are given.The value of A(14) is 49.5, the correct answer is option C. The issue appears to be related to number juggling arrangements, where A(n) speaks to the nth term of the arrangement and a₁ speaks to the primary term of the sequence.
Ready to utilize the equation for the nth term of a math grouping:
A(n) = a₁ + (n-1)d
where d is the common contrast between sequential terms.
A(14) = 4 + (14-1)3.5
Streamlining this condition, we get:
A(14) = 4 + 13*3.5
A(14) = 4 + 45.5
A(14) = 49.5
Hence, the esteem of A(14) is 49.5, which is choice C.
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Find the absolute maximum and minimum values of f(x) =(x^2-x)2/3 as exponent over the interval [-3,2]Absolute Maximum is and it occurs at x =Absolute Minimum is and it occurs at x =
The absolute maximum value of f(x) over the interval [-3, 2] is approximately 5.24 and it occurs at x = 2, and the absolute minimum value is 1/8 and it occurs at x = 1/2.
To find the absolute maximum and minimum values of the function:
[tex]f(x) = (x^2-x)^{(2/3)}[/tex] over the interval [-3, 2], we need to follow these steps:
Find the critical points of the function by solving f'(x) = 0:
[tex]f'(x) = (2x - 1)\times{2/3}\times (x^2 - x)^{(-1/3)} = 0[/tex]
Solving for 2x - 1 = 0, we get x = 1/2. This is the only critical point in the interval [-3, 2].
Evaluate the function at the endpoints and the critical point:
f(-3) = ∛36 ≈ 3.301
f(2) = ∛12² ≈ 5.24
f(1/2) = 1/8
Determine which value is the absolute maximum and which is the absolute minimum:
The absolute maximum value is f(2) ≈ 5.24, and it occurs at x = 2.
The absolute minimum value is f(1/2) = 1/8, and it occurs at x = 1/2.
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in _______ studies, the researcher manipulates the exposure, that is he or she allocates subjects to the intervention or exposure group. (2 pts)
a. Cohort
b. Experimental
c. Case-control
d. Cross sectional
In experimental studies, the researcher manipulates the exposure, that is he or she allocates subjects to the intervention or exposure group.
In experimental studies, the researcher manipulates the exposure or intervention by allocating subjects to the intervention or exposure group. This allows for the comparison of outcomes between the intervention/exposure group and the control group, which did not receive the intervention/exposure.
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Let the random variable X have a discrete uniform distribution on the integers Determine P(X < 6).
Answer: integers 0 <= x <= 60. Determine the mean and variance of X. This problem has been solved!
1 answer
·
Top answer:
Theory : If random variable Y fol
Doesn’t include: < 6).
Step-by-step explanation:
Doesn’t include: < 6).
3. Square ABCD is reflected across the x-axis and then dilated by a scale factor of 2 centered at the origin to form its image square A'B'C'D'. Part A: What are the new coordinates of each vertex? Part B: Explain why Square ABCD is either similar or congruent to Square A'B'C'D.
The new coordinates are A'=(2, -10), B'=(12, -10), C'=(12, -2), D'=(2, -2), and Square ABCD and Square A'B'C'D' are similar, with a scale factor of 2.
What is the scale factor?
A scale factor is a number that represents the amount of magnification or reduction applied to an object, image, or geometrical shape.
Part A:
When Square ABCD is reflected across the x-axis, the y-coordinates of each vertex will change sign while the x-coordinates remain the same. Therefore, the new coordinates of the reflected square will be:
A=(1,-5), B=(6,-5), C=(6,-1), D=(1,-1)
When this reflected square is dilated by a scale factor of 2, each vertex is multiplied by a scalar value of 2, centered at the origin. This means that the new coordinates will be:
A'=(2, -10), B'=(12, -10), C'=(12, -2), D'=(2, -2)
Part B:
To determine whether Square ABCD is similar or congruent to Square A'B'C'D', we need to compare their corresponding side lengths and angles.
First, let's compare the side lengths:
AB = BC = CD = DA = 5 units
A'B' = B'C' = C'D' = D'A' = 10 units
We can see that the side lengths of Square A'B'C'D' are exactly twice as long as the corresponding side lengths of Square ABCD. This tells us that the two squares are similar, with a scale factor of 2.
Next, let's compare the angles:
Square ABCD has four right angles (90 degrees) at each vertex.
Square A'B'C'D' also has four right angles (90 degrees) at each vertex.
Since the corresponding angles of the two squares are congruent, this confirms that the two squares are similar.
Therefore, we can conclude that Square ABCD and Square A'B'C'D' are similar, with a scale factor of 2.
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A baseball player hit 59 home runs in a season. Of the 59 home runs, 24 went to right field, 15 went to right center field, 8 went to center field, 10 went to left center field, and 2 went to left field. (a) What is the probability that a randomly selected home run was hit to right field?
A baseball player hit 59 home runs in a season. Of the 59 home runs, 24 went to right field, 15 went to right centre field, 8 went to centre field, 10 went to left-centre field, and 2 went to left field.
(a) The probability that a randomly selected home run was hit to the right field is 0.407.
To find the probability that a randomly selected home run was hit to right field, you can follow these steps:
Step 1: Identify the total number of home runs and the number of home runs hit to the right field.
Total home runs = 59
Home runs to right field = 24
Step 2: Calculate the probability by dividing the number of home runs hit to the right field by the total number of home runs.
Probability = (Home runs to right field) / (Total home runs) = 24/59
The probability that a randomly selected home run was hit to the right field is 24/59, or approximately 0.407.
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An automobile service center can take care of 12 cars per hour. If cars arrive at the center randomly and independently at a rate of 8 per hour on average, what is the probability of the service center being totally empty in a given hour?
For an automobile service center with average of 12 cars per hour, the probability of the service center being totally empty in a given hour is equals to 0.000335.
The Poisson Probability Distribution is use to determine the probability for the number of events that occur in a period when the average number of events is known. Formula is written as following :[tex]P( \lambda,x) = \frac{e^{ -\lambda } \lambda^{x}}{x!}[/tex], where
[tex] \lambda[/tex] -> rate of successx --> number of success in trials e --> math constant, e = 2.7182Now, we have an automobile service center take care of 12 cars per hour.
Rate on average of car survice hour ,[tex] \lambda[/tex] = 8
We have to determine the value of probability of the service center when it being totally empty in a hour, P(8, 0). So,
[tex]P( 8, 0) = \frac{e^{ -8 } 8^{0}}{0!}[/tex]
= [tex]e^{ -8 } [/tex]
= (2.7182)⁻⁸
= 0.000335
Hence, required probability value is 0.000335.
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Use the normal approximation to find the indicated probability. The sample size is n, the population proportion of successes is p, and X is the number of successes in the sample.
n = 98, p = 0.56: P(X < 56)
The probability of z being less than 0.25 as 0.5987 based on population proportion.
To use the normal approximation, we first need to check if the conditions are met. For this, we need to check if np and n(1-p) are both greater than or equal to 10.
np = 98 x 0.56 = 54.88
n(1-p) = 98 x 0.44 = 43.12
Since both np and n(1-p) are greater than 10, we can use the normal approximation.
Next, we need to find the mean and standard deviation of the sampling distribution of proportion.
Mean = np = 54.88
Standard deviation = sqrt(np(1-p)) = sqrt(98 x 0.56 x 0.44) = 4.43
Now we can standardize the variable X and find the probability:
z = (X - mean) / standard deviation = (56 - 54.88) / 4.43 = 0.25
Using a standard normal table or calculator, we can find the probability of z being less than 0.25 as 0.5987.
Therefore, P(X < 56) = P(Z < 0.25) = 0.5987.
Note that we rounded the mean and standard deviation to two decimal places, but you should keep the full values in your calculations to minimize rounding errors.
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It is believed that using a solid state drive (SSD) in a computer results in faster boot times when compared to a computer with a traditional hard disk (HDD). You sample a group of computers and use the sample statistics to calculate a 90% confidence interval of (4.2, 13). This interval estimates the difference of (average boot time (HDD) - average boot time (SSD)). What can we conclude from this interval?
Question 7 options:
1) We are 90% confident that the average boot time of all computers with an SSD is greater than the average of all computers with an HDD.
2) We do not have enough information to make a conclusion.
3) We are 90% confident that the average boot time of all computers with an HDD is greater than the average of all computers with an SSD.
4) There is no significant difference between the average boot time for a computer with an SSD drive and one with an HDD drive at 90% confidence.
5) We are 90% confident that the difference between the two sample means falls within the interval.
1) We are 90% confident that the average boot time of all computers with an SSD is greater than the average of all computers with an HDD.
Option 5) We are 90% confident that the difference between the two sample means falls within the interval. This means that we can say with 90% confidence that the true difference in average boot times between computers with SSDs and HDDs is somewhere between 4.2 and 13 seconds. We cannot make any conclusions about which type of drive has a faster boot time or whether there is a significant difference between them without further analysis or information.
1) We are 90% confident that the average boot time of all computers with an SSD is greater than the average of all computers with an HDD.
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2. Determine if each of the following sequences converges or diverges. If it converges, state its limit. (a) an= 3 + 5n2 1 tn 3/n V/+ 2 (b) bn NT n (c) An = cos n +1 (d) b) =e2n/(n+2) (e) an = tan-?(I
The limit of the given sequence is infinity. (e) an = tan(n). This sequence oscillates between -infinity and infinity, so it diverges.
(a) To determine if the sequence converges or diverges, we can use the limit comparison test. We compare the given sequence to a known sequence whose convergence/divergence we know. Let bn = 5n^2/n^3 = 5/n. Then, taking the limit as n approaches infinity of (an/bn), we get:
lim (an/bn) = lim [(3 + (5n^2)/tn^(3/n) + 2)/(5/n)]
= lim [(3n^(3/n) + 5n^2)/5]
= ∞
Since the limit is infinity, the sequence diverges.
(b) bn = 1/n. This is a p-series with p = 1, which diverges. Therefore, the given sequence also diverges.
(c) An = cos(n) + 1. The cosine function oscillates between -1 and 1, so the sequence oscillates between 0 and 2. However, since there is no limit to the oscillation, the sequence diverges.
(d) b) bn = e^(2n)/(n+2). To determine if this sequence converges or diverges, we can use the ratio test. Taking the limit as n approaches infinity of (bn+1/bn), we get:
lim (bn+1/bn) = lim (e^(2(n+1))/(n+3)) * (n+2)/e^(2n)
= lim (e^2/(n+3)) * (n+2)
= 0
Since the limit is less than 1, the sequence converges. To find the limit, we can use L'Hopital's rule to evaluate the limit of (e^(2n)/(n+2)) as n approaches infinity:
lim (e^(2n)/(n+2)) = lim (2e^(2n)/(1))
= ∞
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Select the expression that can be used to find the volume of this rectangular prism.
A.
(
6
×
3
)
+
15
=
33
i
n
.
3
B.
(
3
×
15
)
+
6
=
51
i
n
.
3
C.
(
3
×
6
)
+
(
3
×
15
)
=
810
i
n
.
3
D.
(
3
×
6
)
×
15
=
270
i
n
.
3
The correct expression to find the volume of a rectangular prism is D. (3 × 6) × 15 = 270 in.3.
What is expression?Expression is a word, phrase, or gesture that conveys an idea, thought, or feeling. It is an outward representation of an emotion, attitude, or opinion. Expressions can be verbal, physical, or written. They can also take the form of art, music, or dance. Expression is used to communicate and express emotions, thoughts, and ideas. It can be a powerful tool to create a connection with others and build relationships.
The correct expression to find the volume of a rectangular prism is D. (3 × 6) × 15 = 270 in.3. This expression involves multiplying the length, width, and height of the rectangular prism in order to calculate the total volume. In this case, the length is 3, the width is 6, and the height is 15. If these values are multiplied together, the result is 270 in.3, which is the total volume of the rectangular prism.
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The solution to the difference equation Yt+1 + 3y = 16; Yo = 100,t 20 is Select one: a. Yt = 96(-3)^t + 4b. y = 100(-3)^tс. y = 100(3)^td. y = 96(3)^t + 4
The solution to the difference equation Yt+1 + 3y = 16; Yo = 100,t 20.
Hence, the correct option is A.
To solve the difference equation Yt+1 + 3Yt = 16, with initial condition Y0 = 100 and t ≥ 0, we can first find the homogeneous solution, which is
Yh(t) = [tex]A(-1/3)^t[/tex]
Where A is a constant determined by the initial condition. Put in the initial condition Y0 = 100, we get
Yh(0) = A = 100
Therefore, the homogeneous solution is
Yh(t) = [tex]100(-1/3)^t[/tex]
Next, we find the particular solution by assuming a constant value for Yt+1 and Yt, which gives us
Yp(t) = 4
This is because we have
Yt+1 + 3Yt = 16
Yp(t+1) + 3Yp(t) = 16
4 + 3Yp(t) = 16
Yp(t) = 4
So the particular solution is
Yp(t) = 4
Finally, the general solution is the sum of the homogeneous and particular solution
Y(t) = Yh(t) + Yp(t) = [tex]100(-1/3)^t[/tex] + 4
Using the initial condition Y20 = 100, we can solve for the constant A
Y20 = [tex]100(-1/3)^20 + 4 = A(-1/3)^20 + 4[/tex]
100 = [tex]A(-1/3)^20 + 4[/tex]
A = 96
Therefore, the solution to the difference equation Yt+1 + 3Yt = 16 with initial condition Y0 = 100 and t ≥ 0 is
Y(t) = [tex]96(-1/3)^t + 4[/tex]
Yt = [tex]96(-3)^t + 4[/tex]
Hence, the correct option is A.
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The plant Mercury is about 57,900,000 kilometers from the sun. Pluto is about 1. 02 x 10^2 times farther away from the sn than Mercury. About how many kilometers is Pluto from the sun?
The distance between the Pluto and the sun is about 5,905,800,000 kilometers.
Distance between Mercury and the sun is = 57,900,000 kilometers.
The distance of Pluto from the sun
= Pluto is about 1.02 x 10^2 times farther away from the sun than Mercury.
⇒Distance of Pluto from the sun
= Distance of Mercury from the sun x 1.02 x 10^2
⇒Distance of Pluto from the sun = 57,900,000 km x 1.02 x 10^2
⇒Distance of Pluto from the sun = 57,900,000 km x 102
⇒ Distance of Pluto from the sun = 5,905,800,000 kilometers
Therefore, the distance of Pluto is about 5,905,800,000 kilometers away from the sun.
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How do you calculate the required sample size for a desired ME (margin of error)?
Answer: Calculate
Step-by-step explanation: How to calculate the margin of error?
1. Get the population standard deviation (σ) and sample size (n).
2. Take the square root of your sample size and divide it into your population standard deviation.
3. Multiply the result by the z-score consistent with your desired confidence interval according to the following table:
Listen Suppose sin(x) = 3/4, Compute Cos(2x)
We can use the double angle formula for cosine, which is: cos(2x) = 1 - 2*sin^2(x) First, we square sin(x): sin^2(x) = (3/4)^2 = 9/16 Now, substitute this value into the double angle formula: cos(2x) = 1 - 2*(9/16) = 1 - 18/16 = -2/16 So, cos(2x) = -1/8.
To compute Cos(2x), we can use the double angle formula which states that Cos(2x) = 2Cos^2(x) - 1.
Now, we are given that sin(x) = 3/4. Using the Pythagorean identity sin^2(x) + Cos^2(x) = 1, we can solve for Cos(x):
sin^2(x) + Cos^2(x) = 1
3/4^2 + Cos^2(x) = 1
9/16 + Cos^2(x) = 1
Cos^2(x) = 7/16
Cos(x) = ±√(7/16)
Since we know that x is in the first quadrant (sin is positive and Cos is positive), we can take the positive square root:
Cos(x) = √(7/16) = √7/4
Now we can plug this value of Cos(x) into the double angle formula:
Cos(2x) = 2Cos^2(x) - 1
Cos(2x) = 2(√7/4)^2 - 1
Cos(2x) = 2(7/16) - 1
Cos(2x) = 7/8 - 1
Cos(2x) = -1/8
Therefore, Cos(2x) = -1/8.
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Click an item in the list or group of pictures at the bottom of the problem and, holding the button down, drag it into the correct position in the answer box. Release your mouse button when the item is place. If you change your mind, drag the item to the trashcan. Click the trashcan to clear all your answers.
The algebraic expression with fractional exponents that is equivalent to the given radical expression is [tex]x^{\frac{3}{5} }[/tex].
An algebraic expression is what?Variables, constants, and mathematical operations (such as addition, subtraction, multiplication, division, and exponentiation) can all be found in an algebraic equation.
In algebra and other areas of mathematics, algebraic expressions are used to depict connections between quantities and to resolve equations and issues. A radical expression is any mathematical formula that uses the radical (also known as the square root symbol) sign.
To convert the radical expression [tex]\sqrt[5]{x^{3} }[/tex] into an algebraic expression with fractional exponents, we use the following rule:
[tex]a^{1/n}[/tex] = (n-th root of a)
In this case, we have:
[tex]\sqrt[5]{x^{3} }[/tex] = [tex](x^{3})^{\frac{1}{5} }[/tex]
= [tex]x^{\frac{3}{5}}[/tex]
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v = 2i + 4j
w = -2i + 6j
Find the vector projection of v onto w
the vector projection of v onto w is -1i + 3j.To get the vector projection of v onto w, you'll need to use the following formula:
proj_w(v) = (v • w / ||w||^2) * w
Where v = 2i + 4j, w = -2i + 6j, "•" represents the dot product, and ||w|| is the magnitude of w.
Step 1: Find the dot product (v • w)
v • w = (2 * -2) + (4 * 6) = -4 + 24 = 20
Step 2: Find the magnitude of w (||w||)
||w|| = √((-2)^2 + (6)^2) = √(4 + 36) = √40
Step 3: Square the magnitude of w (||w||^2)
||w||^2 = (40)
Step 4: Calculate the scalar value (v • w / ||w||^2)
Scalar value = (20) / (40) = 0.5
Step 5: Multiply the scalar value by w to get the vector projection of v onto w
proj_w(v) = 0.5 * (-2i + 6j) = -1i + 3j
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Use the given data to find the 95% confidence interval estimate of the population mean u. Assume that the population has a normal distribution. IQ scores of professional athletes: Sample size n = 18 Mean x = 105 Standard deviation s = 15 _____ <μ<_____Note: Round your answer to 2 decimal places.
The 95% confidence interval estimate of the population mean μ is 97.53 < μ < 112.47.
We are required to find the 95% confidence interval estimate of the population mean μ, given the sample size n=18, mean x =105, and standard deviation s=15.
In order to calculate the confidence interval, you can follow these steps:1. Determine the t-score for a 95% confidence interval with n-1 degrees of freedom. For a sample size of 18, you have 17 degrees of freedom.
Using a t-table or calculator, you find the t-score to be approximately 2.11.
2. Calculate the margin of error (E) using the formula:
E = t-score × (s / √n)
E = 2.11 × (15 / √18)
E ≈ 7.47
3. Calculate the lower and upper bounds of the confidence interval using the sample mean (x) and margin of error (E):
Lower bound: x - E = 105 - 7.47 = 97.53
Upper bound: x + E = 105 + 7.47 = 112.47
So, the 95% confidence interval estimate is 97.53 < μ < 112.47. Please note that these values are rounded to two decimal places.
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OF Find the particular antiderivative of the following derivative that satisfies the given condition. * = 6et-6; X(0) = 1 dx dt X(t)
The particular antiderivative of X(t) that satisfies the given condition X(0) = 1 is:
[tex]X(t) = 6e^t - 6t + 1[/tex].
The given derivative is X(t) = 6e^t.
To find the particular antiderivative of X'(t), we need to integrate X'(t) with respect to t:
[tex]\int6e^t)dt = 6e^t + C[/tex]
where C is the constant of integration.
Now, we use the given condition X(0) = 1 to find the value of C:
X(0) = 6(1) - 6 + C = 1
Simplifying, we get:
C = 1 + 6 - 6 = 1
Therefore, the particular antiderivative of X(t) that satisfies the given condition X(0) = 1 is:
[tex]X(t) = 6e^t - 6t + 1[/tex].
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Look at the stem and leaf plot. What is the mode of the numbers?
Answer:
Step-by-step explanation:
Mode is the one that occurs the most.
Stem is first number repeated for leaf
so your list of numbers is
10,12,12,22,23,24,30
The one that occurs the most is 12. So your mode is 12.
If there are multiple numbers that are "most" then there is no mode.
lim x approaches infinity (2x-1)(3-x)/(x-1)(x+3) is
The limit of (2x-1)(3-x)/(x-1)(x+3) as x approaches infinity is 0.
To find the limit of the function (2x-1)(3-x)/(x-1)(x+3) as x approaches infinity, we will divide both the numerator and denominator through the highest power of x. In this case, the highest power of x is x², so we can divide both the numerator & the denominator through x²:
[tex][(2x-1)/(x^2)] * [(3-x)/((x-1)/(x^2)(x+3))][/tex]
Now, as x approaches infinity, every of the fractions within the expression procedures zero except for (2x-1)/(x²). This fraction techniques 0 as x procedures infinity because the denominator grows quicker than the numerator. therefore, the limit of the expression as x strategies infinity is:
0 * 0 = 0
Consequently, When x gets closer to infinity, the limit of (2x-1)(3-x)/(x-1)(x+3) is 0.
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What is the 18th term of the arithmetic sequence -13, -9, -5, -1, 3,...? A. A(18) = 55 B. A(18) = 59 C. A(18) = -81 D. A(18) = -153
The 18th term of the arithmetic sequence -13, -9, -5, -1, 3,... is 55. Thus, the right answer is option A. which is A(18) = 55
Arithmetic Progression is a sequence of numbers in which the difference between two numbers in the series is a fixed definite value.
The specific number in the arithmetic progression is calculated by
[tex]a_n=a_1+(n-1)d[/tex]
where [tex]a_n[/tex] is the term in arithmetic progression at the nth term
[tex]a_1[/tex] is the initial term in the arithmetic progression
d is the difference between two consecutive terms
In the given question, [tex]a_1[/tex] = -13
d = -9 - (-13) = 4
Therefore, to calculate the 18th term,
[tex]a_{13}=a_1+(18-1)d[/tex]
= -13 + (17) 4
= -13 + 68
= 55
Hence, the 18th term of the above AP is 55
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A manufacturing manager has developed a table that shows the
average production volume each day for the past three weeks. The
average production level is an example of a numerical measure.
Select one:
True
False
The given statement "A manufacturing manager has developed a table that shows the average production volume which is an example of a numerical measure." is true because it represents central tendency.
The average production level is a numerical measure that represents the central tendency of the production volume for a given period of time. In this case, the manufacturing manager has calculated the average production volume for each day over the past three weeks.
Numerical measures are quantitative values that summarize or describe the data. They are used to provide insights into the characteristics of a dataset, such as the distribution, variability, and central tendency.
Common numerical measures include measures of central tendency, such as the mean, median, and mode, as well as measures of dispersion, such as variance and standard deviation.
The average production level, also known as the mean, is a commonly used measure of central tendency. It is calculated by adding up all the production volumes and dividing by the number of days. The resulting value represents the typical or average production level for the period of time in question.
Therefore, the statement that the average production level is an example of a numerical measure is true.
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